M. O. Bici and G. B. Akari, Improved prediction methods for scalable predictive animated mesh compression, J. Vis. Commun. Image R, vol.22, pp.577-589, 2011.

J. W. Cho, S. Valette, J. H. Park, H. Y. Jung, and R. Prost, 3-D mesh sequence compression using wavelet-based multi-resolution analysis, Applied Mathematics and Computation, vol.216, pp.410-425, 2010.
URL : https://hal.archives-ouvertes.fr/hal-02158554

I. Guskov and A. Khodakovsky, Wavelet compression of parametrically coherent mesh sequences, Eurographics/ACM SIGGRAPH symposium on computer animation, 2004.

M. Hachani, A. Zaid, and W. Puech, Kinematic Reeb Graph Extraction Based on Heat Diffusion, 22nd IEEE International Conference on Pattern Recognition, pp.3981-3986, 2014.
URL : https://hal.archives-ouvertes.fr/lirmm-01379588

M. Hachani, A. Zaid, and W. Puech, Segmentation of 3D Dynamic Meshes Based on Reeb Graph Approach, 22nd European Signal Processing Conference, pp.2175-2179, 2014.
URL : https://hal.archives-ouvertes.fr/lirmm-01379578

Z. Karni and C. Gostman, Compression of soft-body animation sequences, Computer and Graphics, vol.28, pp.25-34, 2004.

B. S. Krongold, K. Ramchandran, and D. L. Jones, Computationally efficient optimal power allocation algorithm for multicarrier communication systems, Proceedings of International Conference on Communications, pp.1018-1022, 1998.

J. Lengyel, Compression of time-dependent geometry, ACM Symposium on Interactive 3D Graphics, pp.89-96, 1999.

K. Mamou, T. Zaharia, and F. Prteux, Multi-chart geometry video: A compact representation for 3D animations, IEEE 3DPVT, pp.711-718, 2006.
URL : https://hal.archives-ouvertes.fr/hal-00272057

K. Mamou, T. Zaharia, and F. Preteux, FAMC: The mpeg-4 standard for animated mesh compression, 15th IEEE International Conference on Image Processing, pp.2676-2679, 2008.
URL : https://hal.archives-ouvertes.fr/hal-01375739

F. Payan and M. Antonini, An efficient bit allocation for compressing normal meshes with an error-driven quantization, Computer Aided Geometric Design. Special Issue on Geometric Mesh Processing, pp.466-486, 2005.
URL : https://hal.archives-ouvertes.fr/hal-00264520

F. Payan and M. Antonini, Temporal wavelet-based compression for 3D animated models, Computers and Graphics, vol.31, pp.77-88, 2007.

N. Stefanoski and J. Ostermann, Spatially and temporally scalable compression of animated 3D meshes with MPEG-4/FAMC, Proceedings of the IEEE International Conference on Image Processing, pp.2696-2699, 2008.

S. Valette, R. Chaine, and R. Prost, Progressive Lossless Mesh Compression Via Incremental Parametric Refinement, Eurographics Symposium on Geometry Processing, vol.28, issue.5, pp.1301-1310, 2009.
URL : https://hal.archives-ouvertes.fr/hal-00533562

L. Vá?a, S. Marras, K. Hormann, and G. Burnett, Compression Dynamic Meshes with Geometric Laplacians, Computer and Graphics Forum, vol.33, issue.2, pp.145-154, 2014.

K. Mueller, A. Smolic, M. Kautzner, and P. Eisert, Rate-distortion-optimized predictive compression of dynamic 3d mesh, SP:IC, vol.9, pp.812-828, 2006.

M. Alexa and W. Müller, Representing animations by principal components, Computer and Graphics Forum, vol.19, issue.3, pp.411-418, 2000.

P. F. Lee, C. K. Kao, J. L. Tseng, B. S. Jong, and T. W. Lin, 3D animation compression using affine transformation matrix and principal component analysis, IEICE-Trans. Inf. Syst. E90-D, vol.7, pp.1073-1084, 2007.

A. Shamir and V. Pascucci, Temporal and spatial level of details for dynamic meshes, Proceedings of virtual reality systems and techniques, pp.423-430, 2001.